Dirichlet problem for supercritical nonlocal operators

Abstract

Let D be a bounded C2-domain. Consider the following Dirichlet initial-boundary problem of nonlocal operators with a drift: ∂t u= L(α) u+b· ∇ u+f\ in\ R+× D,\ \ u| R+× Dc=0,\ u(0,·)|D=, where α∈(0,2) and L(α) is an α-stable-like nonlocal operator with kernel function (x,z) bounded from above and below by positive constants, and b: Rd Rd is a bounded Cβ-function with α+β>1, f: R+× D R is a Cγ-function in D uniformly in t with γ∈((1-α) 0,β], ∈ Cα+γ(D). Under some H\"older assumptions on , we show the existence of a unique classical solution u∈ L∞loc( R+; Cα+γloc(D))× C( R+; Cb(D)) to the above problem. Moreover, we establish the following probabilistic representation for u u(t,x)= Ex ((Xt) 1τD>t)+ Ex(∫tτD0f(t-s,Xs) d s),\ t≥ 0,\ x∈ D, where ((Xt)t≥ 0, Px; x∈ Rd) is the Markov process associated with the operator L(α)+b· ∇, and τD is the first exit time of X from D. In the sub and critical case α∈[1,2), the kernel function can be rough in z. In the supercritical case α∈(0,1), we classify the boundary points according to the sign of b(z)·n(z), where z∈∂ D and n(z) is the unit outward normal vector. Finally, we provide an example and simulate it by Monte-Carlo method to show our results.